nLab Gromov-Witten invariants

Redirected from "Gromov-Ruan-Witten invariant".
Contents

Context

Cohomology

cohomology

Special and general types

Special notions

Variants

Extra structure

Operations

Theorems

Quantum field theory

Contents

Idea

Gromov-Witten theory studies symplectic manifolds via maps of Riemann surfaces into it. In contrast to the fundamental group, where one studies maps from the circle into the space, there is no composition law for Riemann surfaces. Instead, one considers pseudoholomorphic curves in a fixed homology class and with fixed boundary conditions such that only a finite number of such maps exists. These numbers are symplectic invariants. Their computation is difficult and uses enumerative and analytic techniques from Floer homology.

Gromov-Witten invariants are used to deform the cup product of cohomology classes (using only maps from the Riemann sphere into the manifold), leading to quantum cohomology.

Gromov-Witten theory originates in physics from the A-model. A powerful tool to compute Gromov-Witten invariants is mirror symmetry.

The precise mathematical definition uses the notion of the moduli space of stable maps.

Definition

Relation to TQFT

Gromov-Witten invariants may be understood (and have originally been found) as arising from a particular TQFT, or actually a TCFT, called the A-model.

For a useful exposition of this see (Tolland).

References

Expositions

Introductory notes:

Seminar notes:

And this introductory bit on the moduli stack of elliptic curves:

An exposition of GW theory as a TCFT is at

  • AJ Tolland, Gromov-Witten Invariants and Topological Field Theory (blog)

The origin of Gromov-Witten theory in and relation to string theory and other physics motivation is recalled and surveyed in

Via geometric quantization

Discussion in the context of geometric quantization is in

  • Emily Clader, Nathan Priddis, Mark Shoemaker, Geometric Quantization with Applications to Gromov-Witten Theory (arXiv:1309.1150)

As a TCFT

See also the references at A-model.

General

A discussion by quantization of quadratic Hamiltonians is in

  • Alexander Givental, Gromov-Witten invariants and quantization of quadratic Hamiltonians (pdf)

  • Maxim Kontsevich, Yuri Manin, Gromov-Witten classes, quantum cohomology, and enumerative geometry, Comm. Math. Phys. 164 (1994), no. 3, 525–562 (euclid).

  • Yuri Manin, Frobenius manifolds, quantum cohomology and moduli spaces, Amer. Math. Soc., Providence, RI, 1999,

  • W. Fulton, R. Pandharipande, Notes on stable maps and quantum cohomology, in: Algebraic Geometry, Santa Cruz 1995 ed. Kollar, Lazersfeld, Morrison. Proc. Symp. Pure Math. 62, 45–96 (1997)

  • J Robbin, D A Salamon, A construction of the Deligne-Mumford orbifold, J. Eur. Math. Soc. (JEMS) 8 (2006), no. 4, 611–699 (arxiv; pdf at JEMS); corrigendum J. Eur. Math. Soc. (JEMS) 9 (2007), no. 4, 901–905 (pdf at JEMS).

  • J Robbin, Y Ruan, D A Salamon, The moduli space of regular stable maps, Math. Z. 259 (2008), no. 3, 525–574 (doi).

  • Martin A. Guest, From quantum cohomology to integrable systems, Oxford Graduate Texts in Mathematics, 15. Oxford University Press, Oxford, 2008. xxx+305 pp.

  • Joachim Kock, Israel Vainsencher, An invitation to quantum cohomology. Kontsevich’s formula for rational plane curves, Progress in Mathematics, 249. Birkhäuser Boston, Inc., Boston, MA, 2007. xiv+159 pp.

  • Dusa McDuff, Dietmar Salamon, Introduction to symplectic topology, 2 ed. Oxford Mathematical Monographs 1998. x+486 pp.

  • Sheldon Katz, Enumerative geometry and string theory, Student Math. Library 32. IAS/Park City AMS & IAS 2006. xiv+206 pp.

  • Eleny-Nicoleta Ionel, Thomas H. Parker, Relative Gromov-Witten invariants, Ann. of Math. (2) 157 (2003), no. 1, 45–96 (doi).

  • Edward Frenkel, Constantin Teleman,

    AJ Tolland, Gromov-Witten Gauge Theory I (arXiv:0904.4834)

  • Constantin Teleman, The structure of 2D semi-simple field theories (arXiv:0712.0160)

  • Oliver Fabert, Floer theory, Frobenius manifolds and integrable systems, (arxiv/1206.1564)

A generalization is discussed in

Expositions and summaries of this are in

In higher differential geometry / on orbifolds

GW theory of orbifolds (hence in higher differential geometry) has been introduced in

  • Weimin Chen, Yongbin Ruan, Orbifold Gromov-Witten Theory, in Orbifolds in mathematics and physics (Madison, WI, 2001), 25–85, Contemp. Math., 310, Amer. Math. Soc., Providence, RI, 2002 (arXiv:math/0103156)

A review with further pointers is in

In terms of motives

That the pull-push quantization of Gromov-Witten theory is naturally understood as a “motivic quantization” in terms of Chow motives of Deligne-Mumford stacks was suggested in

Further investigation of these stacky Chow motives then appears in

On its relation to tropical geometry:

  • Grigory Mikhalkin?. Enumerative Tropical Algebraic Geometry in 2\mathbb{R}^2. Journal of the American Mathematical Society, Vol. 18, No. 2 (Apr., 2005), pp. 313-377. (doi)

  • Emil Albrychiewicz, Kai-Isaak Ellers, Andrés Franco Valiente, Petr Hořava. Tropological Sigma Models. (2023). (arXiv:2311.00745)

Last revised on June 3, 2024 at 12:14:10. See the history of this page for a list of all contributions to it.